Email this article On an inverse linear programming problem
- Authors: Amirkhanova G.A.1, Golikov A.I.2, Evtushenko Y.G.2
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Affiliations:
- Institute for Information and Computing Technologies
- Dorodnitsyn Computing Center
- Issue: Vol 295, No Suppl 1 (2016)
- Pages: 21-27
- Section: Article
- URL: https://journals.rcsi.science/0081-5438/article/view/174026
- DOI: https://doi.org/10.1134/S0081543816090030
- ID: 174026
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Abstract
A method for solving the following inverse linear programming (LP) problem is proposed. For a given LP problem and one of its feasible vectors, it is required to adjust the objective function vector as little as possible so that the given vector becomes optimal. The closeness of vectors is estimated by means of the Euclidean vector norm. The inverse LP problem is reduced to a problem of unconstrained minimization for a convex piecewise quadratic function. This minimization problem is solved by means of the generalized Newton method.
About the authors
G. A. Amirkhanova
Institute for Information and Computing Technologies
Email: evt@ccas.ru
Kazakhstan, Almaty, 050010
A. I. Golikov
Dorodnitsyn Computing Center
Author for correspondence.
Email: evt@ccas.ru
Russian Federation, Moscow, 119333
Yu. G. Evtushenko
Dorodnitsyn Computing Center
Email: evt@ccas.ru
Russian Federation, Moscow, 119333
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